1,1

21 is the unique k such that k + (product of nonzero digits of k) = 23, hence 23 is a term.

f[n_] := Block[{s = Sort[ IntegerDigits[n]]}, While[ s[[1]] == 0, s = Drop[s, 1]]; n + Times @@ s]; t = Table[0, {200}]; Do[ a = f[n]; If[a < 200, t[[a]]++ ], {n, 200}]; Select[ Range[ 200], t[[ # ]] == 1 &] (from Robert G. Wilson v Jul 16 2004)

(PARI) addpnd(n)=local(k, s, d); k=n; s=1; while(k>0, d=divrem(k, 10); k=d[1]; s=s*max(1, d[2])); n+s

{c=1; z=160; v=vector(z); for(n=1, z+1, k=addpnd(n); if(k<=z, v[k]=v[k]+1)); for(j=1, length(v), if(v[j]==c, print1(j, ", ")))}

Cf. A063114, A096347, A063425, A096922, A096923, A096924, A096925, A096926, A096927, A096928, A096929, A096930, A096931.

Sequence in context: A067030 A072427 A050420 this_sequence A055954 A161602 A055956

Adjacent sequences: A096919 A096920 A096921 this_sequence A096923 A096924 A096925

nonn,base

Klaus Brockhaus (klaus-brockhaus(AT)t-online.de), Jul 15 2004